The geometry of the set of real square roots of I2

Abstract

In this paper we study the geometry of the set of real square roots of I2. After some introductory remarks, we begin our study by deriving by quite elementary methods the forms of the real square roots of I2. We then discuss the interpretations of these square roots as transformations of the cartesian (x,y)-plane. To study the geometry of the set of square roots of I2 we consider a slightly more general set of square matrices of order 2 and show that these sets are hyperboloids of one sheet or hyperboloids of two sheets. From these general results we conclude that the set of involutory matrices of order 2 is a hyperboloid of one sheet and the set of skew-involutory matrices of order 2 is a hyperboloid of two sheets. The relations between the geometrical properties of the hyperboloids and the set of square roots of I2 are also investigated. We then proceed to obtain the forms of the involutory matrices of order 2 by more advanced methods. We have considered two approaches: in the first approach we use the concept of a function of a matrix and in the second approach we use concepts of split-quaternions.